Research on Energy Localization and Vibration Suppression of Axially Functionally Graded Porous Beams. [PDF]
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Chirality-induced phonon spin selectivity by elastic spin-orbit interaction. [PDF]
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Dynamic of composite nanobeams resting on an elastic substrate with variable stiffness. [PDF]
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Shape Optimization and Experimental Investigation of Glue-Laminated Timber Beams. [PDF]
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Boundary Control of the Timoshenko Beam
SIAM Journal on Control and Optimization, 1987The paper investigates uniform stabilization of the Timoshenko beam with boundary control. The main result of the first part, established by means of the energy method combined with \(C_ 0\)-semigroup theory, is that the natural energy of the beam decays exponentially fast.
Kim, Jong Uhn, Renardy, Yuriko
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Unlike the Bernoulli beam formulation, the Timoshenko beam formulation accounts for transverse shear deformation. It is therefore capable of modeling thin or thick beams. In this chapter we perform the analysis of Timoshenko beams in static bending, free vibrations and buckling. We present the basic formulation and show how a MATLAB code can accurately
Ferreira A. J. M., Fantuzzi N.
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Vibrations of Tapered Timoshenko Beams in Terms of Static Timoshenko Beam Functions
Journal of Applied Mechanics, 2000In this paper, the free vibrations of a wide range of tapered Timoshenko beams are investigated. The cross section of the beam varies continuously and the variation is described by a power function of the coordinate along the neutral axis of the beam.
Cheung, YK, Zhou, D
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